Jordan left g, h-derivations over some algebras

Abstract

In this article, left g, h-derivation and Jordan left g, h-derivation on algebras are introduced. It is shown that there is no Jordan left g, h-derivation over Mn(C) and HR, for g not equal to h. Examples are given which show that every Jordan left \g, h\-derivation over Tn(C), Mn(C) and HR are not left \g, h\-derivations. Moreover, we characterize left \g, h\-derivation and Jordan left \g, h\-derivation over Tn(C), Mn(C) and HR respectively. Also, we prove the result of Jordan left \g, h\-derivation to be a left \g, h\-derivation over tensor products of algebras as well as for algebra of polynomials.